1 Answer

Rob Hogan · Answer 1 · 2023-02-25T02:39:16+0000

The given inequality is:

Since this is an absolute value inequality, separate the inequality into possible cases using the definition of an absolute value:

$\begin{gathered} \text{case I}\colon x>2,x\geqslant0 \\ \text{case II}\colon\; -x>2,x<0 \end{gathered}$

For the case I, find the intersection:

$x\in(2,+\infty)$

For case II, solve the first inequality:

$\begin{gathered} -x>2\Rightarrow x<-2 \\ (\text{the inequality was divided by -1 and the inequality sign changed)} \end{gathered}$

Hence, the set of inequalities for case II becomes:

Find the intersection:

$x\in(-\infty,-2)$

Find the union of the two solutions to get the solution of the inequality:

$x\in(-\infty,-2)\cup(2,+\infty)$

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